Abstract
A single item production system has been considered in this proposed work. It is also assumed that the system produced some imperfect items. For this purpose a screening process has been considered here to separate the perfect quality items and imperfect quality items. The perfect quality items have a demand in the market which is depended on the advertisement of the product as well as the selling price of the product. The imperfect quality items are sold in a lot after the production period. As the depreciation rate of the product increases and number of imperfect product increases then there will be a risk in the system of loss in profit. So a risk function has been considered here depending on the depreciation rate of the demand and imperfect production rate of the item. Keeping these phenomenon the proposed model has been maximize for profit and minimize for the risk with numerical illustration.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Taft, E.W.: The most economical production lot. Iron Age 101, 1410–1412 (1918)
Harris, F.W.: Operations and Cost. Factory Management Service. A.W. Shaw co, Chicago (1915)
Goyal, S.K., Gunasekaran, A.: An integrated production inventory marketing model for deteriorating items. Comput. Ind. Eng. 28(4), 755–762 (1995)
Cho, I.D.: Analysis of optimal production and adverting policies. Int. J. Syst. Sci. 27(12), 1297–1305 (1996)
Rosenblatt, M.J., Lee, H.L.: Economic production cycles with imperfect production processes. IIE Trans. 18(1), 48–55 (1986)
Salameh, M.K., Jaber, M.Y.: Economic production quantity model for items with iperfect quality. Int. J. Prod. Econ. 64, 59–64 (2000)
Skouri, K., Papachristos, S.: A continuous review inventory model, with deteriorating items, time-varying demand, linear replenishment cost, partially time-varying backlogging. Appl. Math. Model. 26(5), 603–617 (2002)
Roy, A., Maity, K., Kar, S., Maiti, M.: A production-inventory model with remanufacturing for defective and usable items in fuzzy-environment. Comput. Ind. Eng. 56(1), 87–96 (2009)
Sicilia, J., Gonzlez-De-la-Rosa, M., Febles-Acosta, J., Alcaide-Lpez-de-Pablo, D.: An inventory model for deteriorating items with shortages and time-varying demand. Int. J. Prod. Econ. 155, 155–162 (2014)
Patra, K., Mondal, S.K.: A single item inventory model with variable production rate and defective items. Int. J. Appl. Comput. Math. (2015). https://doi.org/10.1007/s40819-017-0338-0
Das, B.C., Das, B., Mondal, S.K.: An integrated production-inventory model with defective item dependent stochastic credit period. Comput. Ind. Eng. 110, 255–263 (2017)
Manna, A.K., Dey, J., Mondal, S.K.: Imperfect production inventory model with production rate dependent defective rate and advertisement dependent demand. Comput. Ind. Eng. 104, 9–22 (2017)
Mandal, B.N., Phaujdar, S.: An inventory model for deteriorating items and stock dependent consumption rate. J. Oper. Res. Soc. 40, 483–488 (1989)
El-Gohary, A.A., Tadj, L., Al-Rasheed, A.F.: Using optimal control to adjust the production rate of a deteriorating inventory system. J. Taibah Univ. Sci. 2, 69–77 (2009)
Teng, J.T., Chang, C.T.: Economic production quantity models for deteriorating items with price and stock dependent demand. Comput. Oper. Res. 32, 297–308 (2005)
Mishra, V.K., Singh, L., Kumar, R.: An inventory model for deteriorating items with time-dependent demand and time-varying holding cost under partial backlogging. J. Ind. Eng. Int. 9(4), 1–5 (2013)
Uthayakumar, R., Karuppasamy, S.K.: A pharmaceutical inventory model for variable demand and variable holding cost with partially backlogged under permissible delay in payments in healthcare industries. Int. J. Appl. Comput. Math. 3(Suppl 1), 327 (2017)
Chen, S.M., Munif, A., Chen, G.S., Liu, H.C., Kuo, B.C.: Fuzzy risk analysis based on ranking generalized fuzzy numbers with different left heights and right heights. Expert Syst. Appl. 39(2012), 6320–6334 (2012)
Chen, S.M., Wang, C.H.: Fuzzy risk analysis based on ranking fuzzy numbers using \(\alpha \)-cuts, belief features and signal/noise ratios. Expert Syst. Appl. 36(2009), 5576–5581 (2009)
Chen, S.M., Sanguansat, K.: Analyzing fuzzy risk based on a new fuzzy ranking method between generaized fuzzy numbers. Expert Syst. Appl. 38, 2163–2171 (2011)
Patra, K., Mondal, S.K.: Risk analysis in diabetes prediction based on a new approach of ranking of generalized trapezoidal fuzzy numbers. Cybernet. Syst. Int. J. 43(8), 623–650 (2012)
Patra, K., Mondal, S.K.: Fuzzy risk analysis using area and height based similarity measure on generalized trapezoidal fuzzy numbers and its application. Appl. Soft Comput. 28, 276–284 (2015)
Patra, K., Mondal, S.K.: Risk analysis in a production inventory model with fuzzy demand, variable production rate and production time dependenet selling price. Opsearch. 52(3), 505–529 (2015)
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Patra, K. An Production Inventory Model with Imperfect Production and Risk. Int. J. Appl. Comput. Math 4, 91 (2018). https://doi.org/10.1007/s40819-018-0524-8
Published:
DOI: https://doi.org/10.1007/s40819-018-0524-8